1) unilateral weighted shift
单侧加权移位
1.
This paper discusses the commutativity of the commutant {T}′ of unilateral weighted shift T which has 0 weights,and the commutativity of {T}′/rad {T}′.
讨论了带0权的单侧加权移位算子T的交换子{T}′的交换性和{T}/′rad{T}′的交换性与算子的权数序列之间的关系。
2) injective unilateral weighted shift
单的单侧加权移位
1.
Let H be a complex separable infinite dimensional Hillbert space,andW and V be bounded essentially normal injective unilateral weighted shifts operators with different weighted sepuences on H.
设H是复可分无穷维Hilbert空间,W、V分别是H上具有不同权序列的有界本性正规单的单侧加权移位算子。
2.
Let H be a complex separable infinite dimensional Hilbert space,W be a bounded essentially normal injective unilateral weighted shift on H.
设H是复可分无穷维Hilbert空间,W是定义在H上的有界本性正规单的单侧加权移位算子。
3) Unilateral weighted shifts
单侧加权移位算子
4) unilateral operator weighted shift
单侧算子权移位
1.
If {A_k}_(k≥0) be a uniformly bounded sequence of Invertible operators on H, H_n=H,(?)=sum from n=0 to +∞(⊕H_n) the unilateral operator weighted shift S on (?) with the weightedsequence {A_k}_(k≥0) is defined as S(x_0,x_1,x_2,…)=(0, A_0x_0,A_1x_1,…), (x_n)_n∈(?), denoted.
若{A_k}_(k≥0)是H上一致有界的可逆算子序列,设H_n=H,(?)=sum from n=0 to +∞(⊕H_n),(?)上具有算子权序列{A_k}_(k≥0)的单侧算子权移位S定义为S(x_0,x_1,x_2,…)=(0,A_0x_0,A_1x_1,…),(x_n)_n∈(?),记为S~{A_k}_(k≥0)。
5) unilateral shift
单侧移位
1.
A reflexive operator is constructed on the space l 2 by using unilateral shift operator.
利用单侧移位算子在l2 空间中构造了一个自反算子。
6) Bilateral weighted shifts
双侧加权移位算子
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